Chaper X Part 4: Shell/Cyllinder Method:
I am going to leave it to good old Khan to explain the Cyllinder Method. Way to finish strong... I know. I am sorry. He is just so good though.
Chapter X Part 3: Washer Method
Chapter X Part 2: Disk Method
Chapter X Part 1: Reviewing Finding the Area Under a Curve Using Limit Definition Use this video to help you complete the packet below
Chapter 11.3 Integration of Trigonometric Functions
Chapter 11.2 Differentiation of Trigonometric Functions
Chapter 11.1
Loooong Lesson. Sorry.
Examples!!!
Chapter 11 Here is the progress handout. Videos will begin this coming week. Calculus Progress Plan Ch 11 Chapter 10.3Pg. 645 #1-3; 7; 9; 11-19(e.oo); 25; 33-35; 39-42 Video 1: Lesson
I MADE A CHANGE TO THE HOMEWORK!! I CUT OFF THE LAST PROBLEMS. PLEASE SPREAD THE WORD IF YOU ALL COULD TO EACH OTHER. BELOW IS THE OLD ONE THAT I HAD ON YOUR HANDOUTS. ABOVE IS WHAT IT SHOULD BE.
Chapter 9.2 Homework: Pg. 562 #5-21(odd); 23-25; 37-40; 43;44 9.2 Examples: I hope maybe by just doing and seeing the examples, this review will all flow back to you.
9.2 Review Lesson of Unit Circle and Trig Functions
Chapter 8.4 Introduction to Differential Equations I am at my parent's house, and I do not have a microphone, but I did find a video on Youtbube below of a well done differential solving process. Just watch the first 2.5 minutes of it. There are a lot of "solving differentials" on Youtube. I also hope what we did in class helped, and you are doing fine with the assignment. For problem 46, use the example of Newton's Law of Cooling on page 539. We will discuss in class. For 47, we have a maximization problem. Know what you are trying to maximize, put it together, and solve for your critical points. You can do it!!! It is another problem that is just applyig all you have been doing.
Chapter 8.3 Integrating Composition Functions to the -1
Chapter 8.2 DIFFERENTIATING LN and all other exponentials and logarithms
Chapter 8.1 Differentiating and Integrating Exponentials Base e
Chapter 7.4 Solving Logarithm and Exponential Equations
Chapter 6.6 Numerical Integration Homework: Page 449 #1-2;7; 19 In chapter 6.6, we are presented with the situation of not being able to identify a pattern inwhich our 6 rules of integration can be applied. You are looking at an integral, and just nothing you try using the RULES works.
In this chapter, we are going to by only able to approximate the area under the curve. We learned the method of appoximating the area under a function in 6.2 using rectangles. In 6.6, we can use the Simpson's and Trapezoidal Rules. These are very lengthy calculations. I am looking that you can set up these rules properly.
Video 1: Example of using Simpson's Rule and Trapezoidal Rule
Video 2: Example of using Simpson's Rule
Chapter 6.5 Integration by Substitution Homework: Page 442 #1-9(o); 15-21(o); 27;35;39-41; 47; 51; 59 Video 1: Lesson and Examples over Integration by Substitution
Video 2: Continued Lesson on Examples
Chapter 6.4 Properties and Theorems of Integration
Homework:
Page 429 #7-13 (o); 41-42; 59; 63; 69
AND
Page 418 # 35-45 (odd) (I know, this piece of the assignment goes back into 6.3
Video 1: Lesson on 6.4 Fundamental Theorem of Calculus and 6.3 Properties and Rules
Video 2: Examples of 6.3 Properties and Rules
Chapter 6.3 and 6.2 Area Under the Curve •Page 406 # 49-55(o); 60-61 •AND•417 #s 3;4;7; 13-23(odd); 25;27;29;30 Video Part 1: Approximation of area under a funtion Video Part 2: Examples of 6.2 Problems
Video Part 3: Examples of 6.3 Problems
Chapter 6.2 Area Under a Curve
Homework: P. 406 #1;7;9; 15-17; 41-45(o) {Note: I did break up this assignment. On your assignment plan sheet, there were problems #49-55(od); 60;61. Those will be added to the next assignment.}
Monday, Nov. 7th- Chapter 5.2 Part 2 Theorem
5.2 p. 326 #21-27(odd); 29-33(odd)
Sorry this was so late. I will be posting another by the end of the night! Thursday, Nove 4th- Chapter 5.2 Part 2 Mean Value Theorem
5.2 p. 326 # 21-27(od); 29-33(od)
Wednesday, November 3- Chapter 5.2 Rolle's Theorem
Homework: 5.2 p. 326 #3-5; 7-13(odd); 15; 18
Hey, class. Here are the first video productions for this new classroom set up. I warned you that they are pretty boring. I will start to jazz them up as I get familiar with my software. Also, I did have to break it up into several parts. We will work on my Youtube status. Hopefully I will not have to break up my videos for very long.
I am going to leave it to good old Khan to explain the Cyllinder Method. Way to finish strong... I know. I am sorry. He is just so good though.
Chapter X Part 3: Washer Method
Chapter X Part 2: Disk Method
Chapter X Part 1: Reviewing Finding the Area Under a Curve Using Limit Definition
Use this video to help you complete the packet below
Chapter 11.5 Integrating Inverse Trigonmetric Functions
Chapter 11.4 Differentiation Inverse Trigometric Functions
Chapter 11.3 Integration of Trigonometric Functions
Chapter 11.2 Differentiation of Trigonometric Functions
Chapter 11.1
Loooong Lesson. Sorry.
Examples!!!
Chapter 11
Here is the progress handout. Videos will begin this coming week.
Calculus Progress Plan Ch 11
Chapter 10.3 Pg. 645 #1-3; 7; 9; 11-19(e.oo); 25; 33-35; 39-42
Video 1: Lesson
Video 2: Examples
Chapter 10.2
NEW: Pg. 638 #5;6; 11-19(od); 27; 29- 37(od)
I MADE A CHANGE TO THE HOMEWORK!! I CUT OFF THE LAST PROBLEMS. PLEASE SPREAD THE WORD IF YOU ALL COULD TO EACH OTHER. BELOW IS THE OLD ONE THAT I HAD ON YOUR HANDOUTS. ABOVE IS WHAT IT SHOULD BE.
OLD: Pg. 524 #5;6; 11-19(od); 27; 29; 37-45(od); 63;67; 79
Chapter 10.1
Homework: Pg. 630 # 1-3(od); 16-26; 29-49(odd); 57-61(od)
Chapter 9.7 Inverse Trig Functions
Homework: Pg. 607 #3-15(od); 33-34; 49-53(od); & Pg. 615 33
Chapter 9.6 Graphing Other Trig Functions
Homework: Pg. 597 #1-6; 9-17(od); 29-35(od)
Video 1: How to Graph y = cscx and y = secx Functions
Video 2: How to Graph y = tanx and y = cotx Fuctions
Chapter 9.5 Graphing Sine and Cosine
Homework: Pg. #1-9(od); 35-41(od); 47; 49; 53-55
Chapter 9.3 Right Triangle Trigonometry
Homework: Pg. 568 #5;6;9-10; 23-25; 47-49; 51-59
Chapter 9.2
Homework: Pg. 562 #5-21(odd); 23-25; 37-40; 43;44
9.2 Examples: I hope maybe by just doing and seeing the examples, this review will all flow back to you.
9.2 Review Lesson of Unit Circle and Trig Functions
Chapter 8.4 Introduction to Differential Equations
I am at my parent's house, and I do not have a microphone, but I did find a video on Youtbube below of a well done differential solving process. Just watch the first 2.5 minutes of it. There are a lot of "solving differentials" on Youtube.
I also hope what we did in class helped, and you are doing fine with the assignment.
For problem 46, use the example of Newton's Law of Cooling on page 539. We will discuss in class. For 47, we have a maximization problem. Know what you are trying to maximize, put it together, and solve for your critical points. You can do it!!! It is another problem that is just applyig all you have been doing.
Chapter 8.3 Integrating Composition Functions to the -1
Chapter 8.2 DIFFERENTIATING LN and all other exponentials and logarithms
Chapter 8.1 Differentiating and Integrating Exponentials Base e
Chapter 7.4 Solving Logarithm and Exponential Equations
Chapter 7.3 Properties of Logarithms
Chapter 7.2 Graphing Logarithms
Homework: Pg. 473 #2-4; 10-12; 20-24; 52-56; 59;60
Chapter 7.1 Graphing Exponentials
Chapter 6.6 Numerical Integration
Homework:
Page 449 #1-2;7; 19
In chapter 6.6, we are presented with the situation of not being able to identify a pattern inwhich our 6 rules of integration can be applied. You are looking at an integral, and just nothing you try using the RULES works.
In this chapter, we are going to by only able to approximate the area under the curve. We learned the method of appoximating the area under a function in 6.2 using rectangles. In 6.6, we can use the Simpson's and Trapezoidal Rules. These are very lengthy calculations. I am looking that you can set up these rules properly.
Video 1: Example of using Simpson's Rule and Trapezoidal Rule
Video 2: Example of using Simpson's Rule
Chapter 6.5 Integration by Substitution
Homework:
Page 442 #1-9(o); 15-21(o); 27;35;39-41; 47; 51; 59
Video 1: Lesson and Examples over Integration by Substitution
Video 2: Continued Lesson on Examples
Chapter 6.4 Properties and Theorems of Integration
Homework:
Page 429 #7-13 (o); 41-42; 59; 63; 69
AND
Page 418 # 35-45 (odd) (I know, this piece of the assignment goes back into 6.3
Video 1: Lesson on 6.4 Fundamental Theorem of Calculus and 6.3 Properties and Rules
Video 2: Examples of 6.3 Properties and Rules
Chapter 6.3 and 6.2 Area Under the Curve
•Page 406 # 49-55(o); 60-61 •AND•417 #s 3;4;7; 13-23(odd); 25;27;29;30
Video Part 1: Approximation of area under a funtion
Video Part 2: Examples of 6.2 Problems
Video Part 3: Examples of 6.3 Problems
Chapter 6.2 Area Under a Curve
Homework: P. 406 #1;7;9; 15-17; 41-45(o)
{Note: I did break up this assignment. On your assignment plan sheet, there were problems #49-55(od); 60;61. Those will be added to the next assignment.}
Video 1: 6.2 Review of Summation Notation
Video 2: Examples of 6.2
Wed., Dec. 14th- Chapter 6.1 Integration
HW: Pg. 394 1; 4; 9-13(odd); 19-23(odd); 26; 28-31; 37-39; 42; 43
Tues., Nov. 29th- Chapter 5.7 Optimization Problems
HW: Pg. 368 3;4;7-9; 16;17;19;20; 23-25; 33;41;45
Sun., Nov. 27th- Chapter 5.6 Sketching the Curves
HW: Pg. 360 #1-8; 15;17;19-20; 27; 33; 44
Part 1: Review and Start of Example
Part 2: The end of example #8
Tues., Nov. 22nd- Chapter 5.5 Limits at Infinity and Horizontal Asymptotes
HW: Pg.
Pg. 352 1-4; 7; 13-15(odd); 19-27(odd); 29; 31; 33; 37
Part 2 More Examples
Tuesday, Nov. 15th- Chapter 5.4 The Second Derivative and Concavity
Hw: Pg. 342 #1-13(odd);19-23(odd); 29; 32; 33; 41-42; 44-45; 50; 59; 65-68
Vidoe Part 1:Lesson
Part 2: Examples
Wednesday, Nov. 9th- Chapter 5.3 Part 1
Homework: Pg. 344 #4-5; 17-27(odd); 31; 33; 39-43; 55; 63; 69-72
Part 1: Lesson
Part 2: Examples
Monday, Nov. 7th- Chapter 5.2 Part 2 Theorem
5.2 p. 326 #21-27(odd); 29-33(odd)
Sorry this was so late. I will be posting another by the end of the night!
Thursday, Nove 4th- Chapter 5.2 Part 2 Mean Value Theorem
5.2 p. 326 # 21-27(od); 29-33(od)
Wednesday, November 3- Chapter 5.2 Rolle's Theorem
Homework: 5.2 p. 326 #3-5; 7-13(odd); 15; 18
http://www.youtube.com/watch?v=3QqTaqHOU0g
Thursday, October 27- Chapter 5.1 Videos
Hey, class. Here are the first video productions for this new classroom set up. I warned you that they are pretty boring. I will start to jazz them up as I get familiar with my software. Also, I did have to break it up into several parts. We will work on my Youtube status. Hopefully I will not have to break up my videos for very long.
Part 1
Part 2
Part 3